An Isoperimetric Problem With Density and the Hardy Sobolev Inequality in R2

Abstract

We prove, using elementary methods of complex analysis, the following generalization of the isoperimetric inequality: if p∈, ⊂2 then the inequality (||π)p+12≤12π∫|x|pdσ(x) holds true under appropriate assumptions on and p. This solves an open problem arising in the context of isoperimetric problems with density and poses some new ones (for instance generalizations to n). We prove the equivalence with a Hardy-Sobolev inequality, giving the best constant, and generalize thereby the equivalence between the classical isoperimetric inequality and the Sobolev inequality. Furthermore, the inequality paves the way for solving another problem: the generalization of the harmonic transplantation method of Flucher to the singular Moser-Trudinger embedding.